1. Yes. 2. Yes. 3. Yes. 4. Yes.
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Alright, Prof. Kripfganz. Your remarkable expertise in dynamic panel estimation and helpful attitude has benefited me a great deal in my doctoral work. Although a thank you is not at all enough, still thank you so much!
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I have one more doubt: For a dependent variable, Y which follows a dynamic data generating process, what should we assume its lag to be: predetermined or endogenous. I ask this because we need to put this lag also in a gmmiv() or iv() and specify model() for the same in the command.
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If there is no serial correlation in the idiosyncratic error term, then the lagged dependent variable, L.Y, is predetermined.Comment
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Ok.Originally posted by Sebastian Kripfganz View Post
1. By idiosyncratic error term, do you mean that time-varying and cross-section varying part of the composite error term which excludes fixed effects?
2. Is there an empirical way of checking this serial correlation in the idiosyncratic error term or is it a theoretical call?Last edited by Prateek Bedi; 05 May 2020, 10:12.Comment
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- Yes.
- That is precisely what the Arellano-Bond test is doing (for the first-differenced error term). The AR(1) should reject the null hypothesis. The AR(2) test should not reject the null hypothesis.
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Right, Prof. Kripfganz. So in all my regressions, null hypothesis of AR(1) test is indeed rejected and null hypothesis of AR(2) is not rejected. Thus, since there is serial correlation of the first order (in the first-differenced error term) as shown by results of AR(1) test, should I consider the lag of my dependent variable to be endogenous instead of predetermined?Comment
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If there is no serial correlation in the level errors, there will be first-order serial correlation in the first-differenced errors. This is why the AR(1) test should reject. A rejection of the AR(1) test does not imply that there is serial correlation in the level errors. Thus, you can continue treating the lagged dependent variable as predetermined.Comment
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Thank you Prof. Kripfganz for such a clear explanation. Things are much more clear now to me. Thanks a lot!!
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Can we use 0 as the starting and ending lag length for lagged dependent variable i.e. gmmiv(L.Y, lag(0 0) model(fodev))?Originally posted by Sebastian Kripfganz View PostComment
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Ok, Prof. Kripfganz. Since the theory is not very much clear regarding some of the explanatory variables as to whether they should be considered as predetermined or not, I thought of looking at the correlation of the lagged dependent variable with the concerned independent variable in question. The idea is to support my theoretical arguments concerning my decision to consider an independent variable as predetermined or not with the result of this pairwise correlation. If the correlation is not significant, I can support my decision to not consider an independent variable as predetermined. Does this approach sound sensible to you?Originally posted by Sebastian Kripfganz View Post
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Not really. Since the lagged dependent variable is part of the model, the error term only captures effect not measured by the lagged dependent variable. Thus, looking at the correlation with the lagged dependent variable does not tell you anything about the correlation with the error term. In that regard, my response to point 1 in my earlier post #152 was not accurate.Comment
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Ok, Prof. Kripfganz. I understand your viewpoint to an extent. However, I have a doubt. The lagged error term, say uit-1, is actually the residual part of Yit-1, which could not be explained by the model. Hence, if I were to make a sense of the relationship between Xit-1 and uit-1, why can't I just look at the relationship between Yit-1 and Xit-1 since we cannot practically examine the relationship between Xit-1 and uit-1 as they are uncorrelated by construction.
For a time point 't', I agree that since Yit-1 is a part of our model, uit only captures the effect not measured by Yit-1. However, we are trying to estimate a relationship between Xit and uit-1 (and not Xit and uit).
Apologies in advance if the question sounds silly.
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I see your point, but uit-1 is just one part of Yit-1. Xit-1 as well is part of the process determining Yit-1. If Xit itself is serially correlated, i.e. correlated with Xit-1, then Xit will be correlated with Yit-1 because of its correlation with Xit-1. Any observed correlation between Xit and Yit-1 is thus not informative about a potential correlation of Xit with uit-1.
The way to address the question whether Xit is predetermined, is by looking at difference-in-Hansen tests as done in the model selection part of my 2019 London Stata Conference presentation.Comment
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